Quadratic field

Results: 216



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71ON THE REDUCTION THEORY OF BINARY FORMS MICHAEL STOLL AND JOHN E. CREMONA 1. Introduction In [4], a reduction theory for binary forms of degrees three and four with integer coefficients was developed in detail, the motiv

ON THE REDUCTION THEORY OF BINARY FORMS MICHAEL STOLL AND JOHN E. CREMONA 1. Introduction In [4], a reduction theory for binary forms of degrees three and four with integer coefficients was developed in detail, the motiv

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Source URL: homepages.warwick.ac.uk

Language: English - Date: 2006-06-26 05:45:46
72Quadratic Programming Relaxations for Metric Labeling and Markov Random Field MAP Estimation Pradeep Ravikumar John Lafferty School of Computer Science, Carnegie Mellon University, Pittsburgh, PA 15213, USA

Quadratic Programming Relaxations for Metric Labeling and Markov Random Field MAP Estimation Pradeep Ravikumar John Lafferty School of Computer Science, Carnegie Mellon University, Pittsburgh, PA 15213, USA

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Source URL: www.cs.cmu.edu

Language: English - Date: 2006-05-19 14:30:14
73UNRAMIFIED QUATERNION EXTENSIONS OF QUADRATIC NUMBER FIELDS FRANZ LEMMERMEYER Introduction The first mathematician who studied

UNRAMIFIED QUATERNION EXTENSIONS OF QUADRATIC NUMBER FIELDS FRANZ LEMMERMEYER Introduction The first mathematician who studied

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Source URL: www.fen.bilkent.edu.tr

Language: English - Date: 2003-09-11 11:03:51
74GAUSS BOUNDS OF QUADRATIC EXTENSIONS FRANZ LEMMERMEYER Abstract. We give a simple proof of results of Lubelski and Lakein on Gauss bounds for quadratic extensions of imaginary quadratic Euclidean number fields.

GAUSS BOUNDS OF QUADRATIC EXTENSIONS FRANZ LEMMERMEYER Abstract. We give a simple proof of results of Lubelski and Lakein on Gauss bounds for quadratic extensions of imaginary quadratic Euclidean number fields.

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Source URL: www.fen.bilkent.edu.tr

Language: English - Date: 2003-09-11 11:03:12
75ON THE 2-CLASS FIELD TOWER OF A QUADRATIC NUMBER FIELD HELMUT KOCH 1. Introduction Let k = k (0,2) be a quadratic number field with discriminant ∆. For n ≥

ON THE 2-CLASS FIELD TOWER OF A QUADRATIC NUMBER FIELD HELMUT KOCH 1. Introduction Let k = k (0,2) be a quadratic number field with discriminant ∆. For n ≥

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Source URL: www.fen.bilkent.edu.tr

Language: English - Date: 2004-02-22 07:56:02
76Beitr¨age zur Algebra und Geometrie Contributions to Algebra and Geometry Volume[removed]), No. 1, [removed]Belyi’s Theorem Revisited Bernhard K¨

Beitr¨age zur Algebra und Geometrie Contributions to Algebra and Geometry Volume[removed]), No. 1, [removed]Belyi’s Theorem Revisited Bernhard K¨

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Source URL: www.kurims.kyoto-u.ac.jp

Language: English - Date: 2004-01-25 09:20:12
77Pseudorandom bits for polynomials Andrej Bogdanov∗ Emanuele Viola† August 10, 2007

Pseudorandom bits for polynomials Andrej Bogdanov∗ Emanuele Viola† August 10, 2007

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Source URL: projectamericano.com

Language: English - Date: 2007-08-10 18:35:00
78REAL QUADRATIC FIELDS WITH ABELIAN 2-CLASS FIELD TOWER ELLIOT BENJAMIN DEPARTMENT OF MATHEMATICS UNITY COLLEGE, UNITY, ME[removed]AND

REAL QUADRATIC FIELDS WITH ABELIAN 2-CLASS FIELD TOWER ELLIOT BENJAMIN DEPARTMENT OF MATHEMATICS UNITY COLLEGE, UNITY, ME[removed]AND

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Source URL: www.fen.bilkent.edu.tr

Language: English - Date: 2005-03-25 13:48:58
79ON A THEOREM OF AUBRY-THUE ALFRED BRAUER AND R. L. REYNOLDS 1. Introduction. In 1913 L. Aubry [1] proved the following theorem:

ON A THEOREM OF AUBRY-THUE ALFRED BRAUER AND R. L. REYNOLDS 1. Introduction. In 1913 L. Aubry [1] proved the following theorem:

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Source URL: www.math.uga.edu

Language: English - Date: 2011-09-25 15:53:25
80EULER’S TRICK AND SECOND 2-DESCENTS ¨ ¨ OZT ¨ ¨ UN ¨

EULER’S TRICK AND SECOND 2-DESCENTS ¨ ¨ OZT ¨ ¨ UN ¨

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Source URL: www.fen.bilkent.edu.tr

Language: English - Date: 2005-05-14 16:56:15